A. -1
B. 1
C. -4
D. 4
【例4】已知函数f(x)在[-1,2]上连续,且int_(-1)^0f(x)dx=2,int_(0)^1f(2x)dx=1,则int_(-1)^2f(x)dx=
2.(2020山东高数Ⅲ)已知函数f(x)在[-1,2]上连续,且int_(-1)^0f(x)dx=2,int_(0)^1f(2x)dx=1,则int_(-1)
设 f ( x ) 是连续奇函数且(int )_(0)^1f(x)dx=-2 则 (int )_(0)^1f(x)dx=-2设f(x)是连续奇函数且则
设函数f(x)在 (-infty ,+infty ) 上连续,且 (x)=(x)^2-x(int )_(0)^1f(x)dx, 则f(x)为 (-|||-
设(x)=dfrac (1)(1+{x)^2}+sqrt (1-{x)^2}(int )_(0)^1f(x)dx, 则 (int )_(0)^1f(x)dx=设
05 设f(u)为连续函数,且int_(0)^xtf(2x-t)dt=(1)/(2)(1+x^2),f(1)=1.则int_(1)^2f(x)dx=A. $\f
20.设f(x)在[0,1]上连续,f(0)=0,int_(0)^1f(x)dx=0.证明:存在xiin(0,1),使得int_(0)^xif(x)dx=xi
设int_(-1)^13f(x)dx=18,int_(-1)^3f(x)dx=4,int_(-1)^3g(x)dx=3。则int_(-1)^3(1)/(5)[4
求-|||-(1) (int )_(-1)^1f(x)dx;-|||-(2)f(x)dx;-|||-(3) (int )_(3)^-1g(x)dx;-|||-(
设f(x)连续,且 (x)=x+2(int )_(0)^1f(t)dt, 则 f(x)= __